Exercises – Tutorial at ICASSP 2016 Learning Nonlinear Dynamical Models Using Particle Filters

In other words, find the probability density functions f(·) and g(·) in (2) corresponding to the model (1). (b) Simulate the model (1) to produce T = 100 measurements y1:T . Based on these measurements compute the optimal (in the sense that it minimizes the mean square error) estimate of xt | y1:t for t = 1, . . . , T . Implement a bootstrap particle filter and compare to the optimal estimates. You can for example perform this comparison by plotting the root mean square estimate (RMSE) ε(N) as a function of the number of particles used in the particle filter (also plot the RMSE for the optimal estimator in the same figure). The RMSE is defined according to ε(N) , √√√√ 1 T T ∑